Let U⊆C be a bounded domain with smooth boundary and let F be an instance of the continuum Gaussian free field on U with respect to the Dirichlet inner product ∫U∇f(x)⋅∇g(x) dx. The set T(a; U) of a-thick points of F consists of those z∈U such that the average of F on a disk of radius r centered at z has growth $\sqrt{a/\pi}\log\frac{1}{r}$ as r→0. We show that for each 0≤a≤2 the Hausdorff dimension of T(a; U) is almost surely 2−a, that ν2−a(T(a; U))=∞ when 02(T(0; U))=ν2(U) almost surely, where να is the Hausdorff-α measure, and that T(a; U) is almost surely empty when a>2. Furthermore, we prove that T(a; U) is invariant under conformal transformations in an appropriate sense. The notion of a thick point is connected to the Liouville quantum gravity measure with parameter γ given formally by $\Gamma(dz)=e^{\sqrt{2\pi}\gamma F(z)}\,dz$ considered by Duplantier and Sheffield.
@article{1268143535,
author = {Hu, Xiaoyu and Miller, Jason and Peres, Yuval},
title = {Thick points of the Gaussian free field},
journal = {Ann. Probab.},
volume = {38},
number = {1},
year = {2010},
pages = { 896-926},
language = {en},
url = {http://dml.mathdoc.fr/item/1268143535}
}
Hu, Xiaoyu; Miller, Jason; Peres, Yuval. Thick points of the Gaussian free field. Ann. Probab., Tome 38 (2010) no. 1, pp. 896-926. http://gdmltest.u-ga.fr/item/1268143535/